We present novel stable solutions which are soliton pairs and trains o
f the 1D complex Ginzburg-Landau equation (CGLE), and analyze them. We
propose that the distance between the pulses and the phase difference
between them is defined by energy and momentum balance equations. We
present a two-dimensional phase plane (''interaction plane'') for anal
yzing the stability properties and general dynamics of two-soliton sol
utions of the CGLE.